On stability properties of powers of polymatroidal ideals

Abstract

Let R=K[x1,...,xn] be the polynomial ring in n variables over a field K with the maximal ideal m=(x1,...,xn). Let (I) and (I) be the smallest integer n for which (In) and (In) stabilize, respectively. In this paper we show that (I)=(I) in the following cases: itemize [(i)] I is a matroidal ideal and n≤ 5. [(ii)] I is a polymatroidal ideal, n=4 and m∞(I), where ∞(I) is the stable set of associated prime ideals of I. [(iii)] I is a polymatroidal ideal of degree 2. itemize Moreover, we give an example of a polymatroidal ideal for which (I)≠(I). This is a counterexample to the conjecture of Herzog and Qureshi, according to which these two numbers are the same for polymatroidal ideals.